EP 3313100 B1 20210224 - METHOD AND APPARATUS FOR HIGHER ORDER AMBISONICS ENCODING AND DECODING USING SINGULAR VALUE DECOMPOSITION
Title (en)
METHOD AND APPARATUS FOR HIGHER ORDER AMBISONICS ENCODING AND DECODING USING SINGULAR VALUE DECOMPOSITION
Title (de)
VERFAHREN UND VORRICHTUNG ZUR CODIERUNG UND DECODIERUNG VON AMBISONICS HÖHERER ORDNUNG MITTELS EINZELWERTSCHÄTZUNG
Title (fr)
PROCÉDÉ ET APPAREIL DE CODAGE ET DÉCODAGE AMBISONIQUE D'ORDRE SUPÉRIEUR AU MOYEN D'UNE DÉCOMPOSITION DE VALEUR SINGULIÈRE
Publication
Application
Priority
- EP 13306629 A 20131128
- EP 14800035 A 20141118
- EP 2014074903 W 20141118
Abstract (en)
[origin: EP2879408A1] The encoding and decoding of HOA signals using Singular Value Decomposition includes forming (11) based on sound source direction values and an Ambisonics order corresponding ket vectors (| Y (© s )Œª) of spherical harmonics and an encoder mode matrix (ž O x S ). From the audio input signal (| x (© s )Œª) a singular threshold value ( à µ ) determined. On the encoder mode matrix a Singular Value Decomposition (13) is carried out in order to get related singular values which are compared with the threshold value, leading to a final encoder rank ( r fin e ) . Based on direction values (© l ) of loudspeakers and a decoder Ambisonics order ( N l ), corresponding ket vectors (|Y(© l )Œª) and a decoder mode matrix (¨ O x L ) are formed (18). On the decoder mode matrix a Singular Value Decomposition (19) is carried out, providing a final decoder rank ( r fin d ). From the final encoder and decoder ranks a final rank is determined, and from this final rank and the encoder side Singular Value Decomposition an adjoint pseudo inverse (ž + ) € of the encoder mode matrix (ž O x S ) and an Ambisonics ket vector (|a' s Œª) are calculated. The number of components of the Ambisonics ket vector is reduced (16) according to the final rank so as to provide an adapted Ambisonics ket vector (|a' l Œª). From the adapted Ambisonics ket vector, the output values of the decoder side Singular Value Decomposition and the final rank an adjoint decoder mode matrix (¨) € is calculated (15), resulting in a ket vector (| y (© l )Œª) of output signals for all loudspeakers.
IPC 8 full level
H04S 3/00 (2006.01)
CPC (source: CN EP KR US)
G10L 19/008 (2013.01 - KR); H04S 3/008 (2013.01 - CN EP KR US); H04S 3/02 (2013.01 - CN EP US); H04S 7/308 (2013.01 - US); G10L 19/008 (2013.01 - CN EP US); H04S 2420/11 (2013.01 - CN EP KR US)
Citation (examination)
CHRISTIAN HANSEN: "Rank-Deficient and Discrete Ill-Posed Problems: Numerical Aspects of Linear Inversion", 1 January 2005 (2005-01-01), XP055530346, ISBN: 978-0-89871-403-6, Retrieved from the Internet <URL:https://play.google.com/store/books/details?id=A5XWG_PFFdcC&rdid=book-A5XWG_PFFdcC&rdot=1&source=gbs_vpt_read&pcampaignid=books_booksearch_viewport> [retrieved on 20181205]
Designated contracting state (EPC)
AL AT BE BG CH CY CZ DE DK EE ES FI FR GB GR HR HU IE IS IT LI LT LU LV MC MK MT NL NO PL PT RO RS SE SI SK SM TR
DOCDB simple family (publication)
EP 2879408 A1 20150603; CN 105981410 A 20160928; CN 105981410 B 20180102; CN 107889045 A 20180406; CN 107995582 A 20180504; CN 108093358 A 20180529; EP 3075172 A1 20161005; EP 3075172 B1 20171213; EP 3313100 A1 20180425; EP 3313100 B1 20210224; HK 1246554 A1 20180907; HK 1248438 A1 20181012; HK 1249323 A1 20181026; JP 2017501440 A 20170112; JP 2019082741 A 20190530; JP 2020149062 A 20200917; JP 6495910 B2 20190403; JP 6707687 B2 20200610; JP 6980837 B2 20211215; KR 102319904 B1 20211102; KR 102460817 B1 20221031; KR 20160090824 A 20160801; KR 20210132744 A 20211104; US 10244339 B2 20190326; US 10602293 B2 20200324; US 2017006401 A1 20170105; US 2017374485 A1 20171228; US 2019281400 A1 20190912; US 9736608 B2 20170815; WO 2015078732 A1 20150604
DOCDB simple family (application)
EP 13306629 A 20131128; CN 201480074092 A 20141118; CN 201711438479 A 20141118; CN 201711438488 A 20141118; CN 201711438504 A 20141118; EP 14800035 A 20141118; EP 17200258 A 20141118; EP 2014074903 W 20141118; HK 18105960 A 20180508; HK 18107560 A 20180611; HK 18108667 A 20180704; JP 2016534923 A 20141118; JP 2019041597 A 20190307; JP 2020087853 A 20200520; KR 20167014251 A 20141118; KR 20217034751 A 20141118; US 201415039887 A 20141118; US 201715676843 A 20170814; US 201916353891 A 20190314